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Football Manager 2011 (2010/RUS/ENG/Full/Repack)

1 November 2010

1 November 2010

**Genre:** Strategy (Manage / Busin. / Turn-based) / Sport (Soccer) / 3D**Released:** 2010**Developer:** Sports Interactive**Publisher:** SEGA**Platform:** PC**Publication Type:** license**Language:** English (ENG)

Football - the game that won the hearts of millions and enjoying the same success - and as a professional sport, and in the format of virtual entertainment. However, not all dream of laurels Lionel Messi, Cristiano Ronaldo and Andrei Arshavin. For those who see themselves not primarily a striker or goalkeeper, while the "soldier and" efficient and able manager, is this game.

Take any team under its wing: type players, conduct training and matches, transfer agreements and take part in international tournaments. Do not miss the opportunity to look at football is not from the penalty and, on the brows of the field, to take control of your favorite team and bring it to the championship title!

Math Tutor DVD - Differential Equations Vol. 1 - First Order Equations (ELearning)

10 May 2011

**Math Tutor DVD - Differential Equations Vol. 1 - First Order Equations (ELearning)**

English | 10 Hours | 720x540 | MPEG2 | 29.97fps 1703kbps | MP3 192kbps | 6.9GB

Genre: eLearning

http://www.mathtutordvd.com/products/item68.cfm

Differential equations is used in all branches of engineering and science. In essence, once a student begins to study more complex problems, nature usually obeys a differential equation which means that the equation involves one or more derivatives of the unknown variable.

In other words, a differential equation involves the rate of change of a variable rather than the variable itself. The simplest example of this is F=ma. The "a" is acceleration which is the second derivative of the position of the object. Although differential equations may look simple to solve by just integration, they frequently require complex solution methods with many steps.

This 10 hour DVD course teaches how to solve first order differential equations using fully worked example problems. All intermediate steps are shown along with graphing methods and applications of differential equations in science and engineering.

10 May 2011

English | 10 Hours | 720x540 | MPEG2 | 29.97fps 1703kbps | MP3 192kbps | 6.9GB

Genre: eLearning

http://www.mathtutordvd.com/products/item68.cfm

Differential equations is used in all branches of engineering and science. In essence, once a student begins to study more complex problems, nature usually obeys a differential equation which means that the equation involves one or more derivatives of the unknown variable.

In other words, a differential equation involves the rate of change of a variable rather than the variable itself. The simplest example of this is F=ma. The "a" is acceleration which is the second derivative of the position of the object. Although differential equations may look simple to solve by just integration, they frequently require complex solution methods with many steps.

This 10 hour DVD course teaches how to solve first order differential equations using fully worked example problems. All intermediate steps are shown along with graphing methods and applications of differential equations in science and engineering.

Nonlinear Partial Differential Equations in Differential Geometry, Volume 2

8 April 2011

**Nonlinear Partial Differential Equations in Differential Geometry, Volume 2**

What distinguishes differential geometry in the last half of the twentieth century from its earlier history is the use of nonlinear partial differential equations in the study of curved manifolds, submanifolds, mapping problems, and function theory on manifolds, among other topics. The differential equations appear as tools and as objects of study, with analytic and geometric advances fueling each other in the current explosion of progress in this area of geometry in the last twenty years. This book contains lecture notes of minicourses at the Regional Geometry Institute at Park City, Utah, in July 1992. Presented here are surveys of breaking developments in a number of areas of nonlinear partial differential equations in differential geometry. The authors of the articles are not only excellent expositors, but are also leaders in this field of research. All of the articles provide in-depth treatment of the topics and require few prerequisites and less background than current research articles. ...

8 April 2011

1995 | 339 | ISBN: 0821804316 | DJVU | 6 Mb

What distinguishes differential geometry in the last half of the twentieth century from its earlier history is the use of nonlinear partial differential equations in the study of curved manifolds, submanifolds, mapping problems, and function theory on manifolds, among other topics. The differential equations appear as tools and as objects of study, with analytic and geometric advances fueling each other in the current explosion of progress in this area of geometry in the last twenty years. This book contains lecture notes of minicourses at the Regional Geometry Institute at Park City, Utah, in July 1992. Presented here are surveys of breaking developments in a number of areas of nonlinear partial differential equations in differential geometry. The authors of the articles are not only excellent expositors, but are also leaders in this field of research. All of the articles provide in-depth treatment of the topics and require few prerequisites and less background than current research articles. ...

Theory of Causal Differential Equations

30 September 2011

**Theory of Causal Differential Equations**

The theory of causal differential equations CDE includes several types of dynamic systems such as ordinary differential equations, functional differential equations, integro-differential equations with or without memory, differential equations with anticipation and retardation. This is the first book which describes the theory of CDE as an independent discipline, incorporating the recent general theory of CDE and introducing several new ideas. This book is a timely introduction to the subject in a more generalised frame work. The present monograph collects recent works in this broad area and provides possible extensions to other dynamic systems involving causal operators such as CDE in abstract spaces, CDE with memory, CDE with fractional derivatives and causal set differential equations-giving initial apparatus, for further study in this important branch of nonlinear analysis. ...

30 September 2011

2009 | 220 | ISBN: 9078677325 | DJVU | 1 Mb

The theory of causal differential equations CDE includes several types of dynamic systems such as ordinary differential equations, functional differential equations, integro-differential equations with or without memory, differential equations with anticipation and retardation. This is the first book which describes the theory of CDE as an independent discipline, incorporating the recent general theory of CDE and introducing several new ideas. This book is a timely introduction to the subject in a more generalised frame work. The present monograph collects recent works in this broad area and provides possible extensions to other dynamic systems involving causal operators such as CDE in abstract spaces, CDE with memory, CDE with fractional derivatives and causal set differential equations-giving initial apparatus, for further study in this important branch of nonlinear analysis. ...

Partial Differential Equations III: Nonlinear Equations

25 July 2010**Partial Differential Equations III: Nonlinear Equations**

25 July 2010

Springer 1996 | 636 | ISBN: 0387946527 | PDF | 6

This is the third of three volumes on partial differential equations. It is devoted to nonlinear PDE. There are treatments of a number of equations of classical continuum mechanics, including relativistic versions. There are also treatments of various equations arising in differential geometry, such as in the study of minimal surfaces, isometric imbedding, conformal deformation, harmonic maps, and prescribed Gauss curvature. In addition, some nonlinear diffusion problems are studied. Analytical tools introduced in this volume include the theory of L^p Sobolev spaces, H lder spaces, Hardy spaces, and Morrey spaces, and also a development of Calderon-Zygmund theory and paradifferential operator calculus. The book is addressed to graduate students in mathematics and to professional mathematicians, with an interest in partial differential equations, mathematical physics, differential geometry, harmonic analysis and complex analysis. ...Golden Differential Equations

6 April 2010

**Golden Differential Equations**

Laxmi Publications | 2005 | ISBN: 8170080606 | 505 pages | PDF | 14 MB

Contents:

1. Differential Equations and their Formation; 2. Solution of Differential Equations of the First Order and First Degree; 3. Linear Equations with Constant Co-efficients; 4. Applications to Geometry and Mechanics; 5. Homogenouse Linear Equations; 6. Trajectories; 7. Equations of the First Order but not of the First Degree; 8. Linear Equations of Second Order; 9. Simultaneous Differential Equations; 10. Legendre's Equation; 11. Bessel's Equations

6 April 2010

Laxmi Publications | 2005 | ISBN: 8170080606 | 505 pages | PDF | 14 MB

Contents:

1. Differential Equations and their Formation; 2. Solution of Differential Equations of the First Order and First Degree; 3. Linear Equations with Constant Co-efficients; 4. Applications to Geometry and Mechanics; 5. Homogenouse Linear Equations; 6. Trajectories; 7. Equations of the First Order but not of the First Degree; 8. Linear Equations of Second Order; 9. Simultaneous Differential Equations; 10. Legendre's Equation; 11. Bessel's Equations

Selected Works of Ellis Kolchin with Commentary

28 July 2010**Selected Works of Ellis Kolchin with Commentary**

28 July 2010

American Mathematical Society 1999 | 639 | ISBN: 0821805428 | PDF | 10

The work of Joseph Fels Ritt and Ellis Kolchin in differential algebra paved the way for exciting new applications in constructive symbolic computation, differential Galois theory, the model theory of fields, and Diophantine geometry. This volume assembles Kolchin's mathematical papers, contributing solidly to the archive on construction of modern differential algebra. This collection of Kolchin's clear and comprehensive papers--in themselves constituting a history of the subject--is an invaluable aid to the student of differential algebra. In 1910, Ritt created a theory of algebraic differential equations modeled not on the existing transcendental methods of Lie, but rather on the new algebra being developed by E. Noether and B. van der Waerden. Building on Ritt's foundation, and deeply influenced by Weil and Chevalley, Kolchin opened up Ritt theory to modern algebraic geometry. In so doing, he led differential geometry in a new direction. By creating differential algebraic geometry and the theory of differential algebraic groups, Kolchin provided the foundation for a ``new geometry'' that has led to both a striking and an original approach to arithmetic algebraic geometry. Intriguing possibilities were introduced for a new language for nonlinear differential equations theory. The volume includes commentary by A. Borel, M. Singer, and B. Poizat. Also Buium and Cassidy trace the development of Kolchin's ideas, from his important early work on the differential Galois theory to his later groundbreaking results on the theory of differential algebraic geometry and differential algebraic groups. Commentaries are self-contained with numerous examples of various aspects of differential algebra and its applications. Central topics of Kolchin's work are discussed, presenting the history of differential algebra and exploring how his work grew from and transformed the work of Ritt. New directions of differential algebra are illustrated, outlining important current advances. Prerequisite to understanding the text is a background at the beginning graduate level in algebra, specifically commutative algebra, the theory of field extensions, and Galois theory. ...Solving Ordinary Differential Equations II: Stiff and Differential-Algebraic Problems

26 March 2010

**Solving Ordinary Differential Equations II: Stiff and Differential-Algebraic Problems**

Springer | 2010 | ISBN: 3642052207, 3540604529 | 614 pages | PDF | 59,5 MB

The subject of this book is the solution of stiff differential equations and of differential-algebraic systems (differential equations with constraints). The book is divided into four chapters. The beginning of each chapter is of introductory nature, followed by practical applications, the discussion of numerical results, theoretical investigations on the order and accuracy, linear and nonlinear stability, convergence and asymptotic expansions.

26 March 2010

Springer | 2010 | ISBN: 3642052207, 3540604529 | 614 pages | PDF | 59,5 MB

The subject of this book is the solution of stiff differential equations and of differential-algebraic systems (differential equations with constraints). The book is divided into four chapters. The beginning of each chapter is of introductory nature, followed by practical applications, the discussion of numerical results, theoretical investigations on the order and accuracy, linear and nonlinear stability, convergence and asymptotic expansions.

Symmetries of Integro-Differential Equations: With Applications in Mechanics and Plasma Physics

6 October 2010

**Symmetries of Integro-Differential Equations: With Applications in Mechanics and Plasma Physics**

Springer | 2010-09-11 | ISBN: 9048137969 | 316 pages | PDF | 12 MB

This book aims to coherently present applications of group analysis to integro-differential equations in an accessible way. The book will be useful to both physicists and mathematicians interested in general methods to investigate nonlinear problems using symmetries.

Differential and integro-differential equations, especially nonlinear, present the most effective way for describing complex processes. Therefore, methods to obtain exact solutions of differential equations play an important role in physics, applied mathematics and mechanics. This book provides an easy to follow, but comprehensive, description of the application of group analysis to integro-differential equations.

6 October 2010

Springer | 2010-09-11 | ISBN: 9048137969 | 316 pages | PDF | 12 MB

This book aims to coherently present applications of group analysis to integro-differential equations in an accessible way. The book will be useful to both physicists and mathematicians interested in general methods to investigate nonlinear problems using symmetries.

Differential and integro-differential equations, especially nonlinear, present the most effective way for describing complex processes. Therefore, methods to obtain exact solutions of differential equations play an important role in physics, applied mathematics and mechanics. This book provides an easy to follow, but comprehensive, description of the application of group analysis to integro-differential equations.

Similarity Methods for Differential Equations

3 July 2011

**Similarity Methods for Differential Equations**

3540901078The aim of this book is to provide a systematic and practical account of methods of integration of ordinary and partial differential equations based on invariance under continuous (Lie) groups of transformations. The goal of these methods is the expression of a solution in terms of quadrature in the case of ordinary differential equations of first order and a reduction in order for higher order equations. For partial differential equations at least a reduction in the number of independent variables is sought and in favorable cases a reduction to ordinary differential equations with special solutions or quadrature. ...

3 July 2011

1974 | 348 | ISBN: 0387901078 | DJVU | 2 Mb

3540901078The aim of this book is to provide a systematic and practical account of methods of integration of ordinary and partial differential equations based on invariance under continuous (Lie) groups of transformations. The goal of these methods is the expression of a solution in terms of quadrature in the case of ordinary differential equations of first order and a reduction in order for higher order equations. For partial differential equations at least a reduction in the number of independent variables is sought and in favorable cases a reduction to ordinary differential equations with special solutions or quadrature. ...